"Gabriel's theorem"의 두 판 사이의 차이

2014년 4월 23일 (수) 19:45 판

statement

thm (Gabriel)

A connected quiver Q has finite type iff the underlying graph is a Dynkin diagram of (A,D,E) type. Moreoever there is a bijection between {indecomposable kQ-modules} and {positive roots} $$M \to \dim M$$ where $\dim$ is dimension vector

idea of proof

define tilting functor
get Coxeter element

Kac theorem

related items

Quiver representations

expositions

Carroll, Gabriel's Theorem

@@ 1번째 줄: / 1번째 줄: @@
 ==statement==
-* \thm (Gabriel)
+;thm (Gabriel)
-*  A connected quiver Q has finite type iff the underlying graph is a Dynkin diagram of (A,D,E) type. Moreoever there is a bijection<br> {indecomposable kQ-modules} -> {positive roots}<br> M -> dim M (dimension vector)<br>
+A connected quiver Q has finite type iff the underlying graph is a Dynkin diagram of (A,D,E) type. Moreoever there is a bijection between {indecomposable kQ-modules} and {positive roots}
+$$M \to \dim M$$
+where $\dim$ is dimension vector